Graphical rule of transforming continuous-variable graph states by local homodyne detection
arXiv:1006.3974 · doi:10.1103/PhysRevA.82.034303
Abstract
Graphical rule, describing that any single-mode homodyne detection turns a given continuous-variable (CV) graph state into a new one, is presented. Employing two simple graphical rules: local complement operation and vertex deletion (single quadrature-amplitude $\hat{x}$ measurement), the graphical rule for any single-mode quadrature component measurement can be obtained. The shape of CV weighted graph state may be designed and constructed easily from a given larger graph state by applying this graphical rule.
4 pages, 3 figures